Extension theorems for Hamming varieties over finite fields
Abstract
We study the finite field extension estimates for Hamming varieties Hj, j∈ Fq*, defined by Hj=\x∈ Fqd: Πk=1d xk=j\, where Fqd denotes the d-dimensional vector space over a finite field Fq with q elements. We show that although the maximal Fourier decay bound on Hj away from the origin is not good, the Stein-Tomas L2 Lr extension estimate for Hj holds.
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